In this paper we address the pure parsimony haplotyping problem: Find a minimum number of haplotypes that explains a given set of genotypes. We prove that the problem is APX-hard and present a 2(k-1)-approximation algorithm for the case in which each genotype has at most k ambiguous positions. We further give a new integer-programming formulation that has (for the first time) a polynomial number variables and constraints. Finally, we give approximation algorithms, not based on linear programming, whose running times are almost linear in the input size
The problem Parsimony Haplotyping (PH) asks for the smallest set of haplotypes which can explain a g...
The haplotype resolution from xor-genotype data has been recently formulated as a new model for gene...
We introduce an exact algorithm, based on Integer Linear Programming, for the parsimony haplotyping ...
Abstract. Parsimony haplotyping is the problem of finding a smallest size set of haplotypes that can...
In this paper we present a collection of results pertaining to haplotyping. The first set of results...
AbstractSimilarity and diversity among individuals of the same species are expressed in small DNA va...
We present two integer programming models for the Haplotype Inference by Pure Parsimony problem. The...
Similarity and diversity among individuals of the same species are expressed in small DNA variations...
The Pure Parsimony Haplotyping (PPH) problem is a NP-hard combinatorial optimization problem that co...
The Pure Parsimony Haplotyping (PPH) problem is a NP-hard combinatorial optimization problem that co...
The Pure Parsimony Haplotyping (PPH) problem is a NP-hard combinatorial optimization problem that co...
Haplotyping estimation from aligned single nucleotide polymorphism fragments has attracted increasin...
The problem Parsimony Haplotyping (PH) asks for the smallest set of haplotypes which can explain a g...
The parsimony haplotyping problem was shown to be NP-hard when each genotype had k = 0 ambiguous pos...
Single Nucleotide Polymorphisms (SNPs) are the most common form of variations in the human genome. C...
The problem Parsimony Haplotyping (PH) asks for the smallest set of haplotypes which can explain a g...
The haplotype resolution from xor-genotype data has been recently formulated as a new model for gene...
We introduce an exact algorithm, based on Integer Linear Programming, for the parsimony haplotyping ...
Abstract. Parsimony haplotyping is the problem of finding a smallest size set of haplotypes that can...
In this paper we present a collection of results pertaining to haplotyping. The first set of results...
AbstractSimilarity and diversity among individuals of the same species are expressed in small DNA va...
We present two integer programming models for the Haplotype Inference by Pure Parsimony problem. The...
Similarity and diversity among individuals of the same species are expressed in small DNA variations...
The Pure Parsimony Haplotyping (PPH) problem is a NP-hard combinatorial optimization problem that co...
The Pure Parsimony Haplotyping (PPH) problem is a NP-hard combinatorial optimization problem that co...
The Pure Parsimony Haplotyping (PPH) problem is a NP-hard combinatorial optimization problem that co...
Haplotyping estimation from aligned single nucleotide polymorphism fragments has attracted increasin...
The problem Parsimony Haplotyping (PH) asks for the smallest set of haplotypes which can explain a g...
The parsimony haplotyping problem was shown to be NP-hard when each genotype had k = 0 ambiguous pos...
Single Nucleotide Polymorphisms (SNPs) are the most common form of variations in the human genome. C...
The problem Parsimony Haplotyping (PH) asks for the smallest set of haplotypes which can explain a g...
The haplotype resolution from xor-genotype data has been recently formulated as a new model for gene...
We introduce an exact algorithm, based on Integer Linear Programming, for the parsimony haplotyping ...